Course details
Semester
- Spring 2024
- Monday, January 29th to Friday, March 22nd; Monday, April 22nd to Friday, May 3rd
Hours
- Live lecture hours
- 10
- Recorded lecture hours
- 0
- Total advised study hours
- 40
Timetable
- Thursdays
- 12:05 - 12:55 (UK)
Description
This module will consider the circumstances under which the Reynolds number will be small and examine the basic properties of low-Reynolds-number flows. We shall present a number of solution techniques, and show how they can be applied to a range of problems. In the course of this, students will meet various useful applied mathematics methods, including solution by potentials, boundary integral methods, and asymptotic approximations.
Prerequisites
- Vector Calculus (div, grad, curl, line,surface/volume integrals, divergence theorem)
- Differential Equations (methods for first-order ordinary differential equations)
- Basic Fluid Mechanics (introductory course in inviscid fluid mechanics)
- Further Fluid mechanics (introductory course in viscous fluid mechanics)
- Tensors and the Einstein Summation Convention (some previous experience useful)
- Non-dimensionalisation / scaling analysis
Syllabus
- Introduction to low-Reynolds-number flow (3 lectures)
The Stokes equations and boundary conditions. Basic properties, uniqueness theorem, reciprocal theorem, minimum dissipation theorem. Oscillating Couette flow and Poiseuille flow. - Fundamental solutions and representation by potentials (4 lectures)
Solution using potentials. Papkovich-Neuber potentials, flow past a rigid sphere. Boundary integrals and the multi-pole expansion. - Slender-body theory (3 lectures)
Basic derivation. Applications to sedimenting slender objects and swimming micro-organisms.
Lecturer
-
Dr Robert Whittaker
- University
- University of East Anglia
Bibliography
Follow the link for a book to take you to the relevant Google Book Search page
You may be able to preview the book there and see links to places where you can buy the book. There is also link marked 'Find this book in a library' - this sometimes works well, but not always - you will need to enter your location, but it will be saved after you do that for the first time.
- An Introduction to Fluid Dynamics (C. K. Batchelor and G. K. Batchelor, book)
- Boundary Integral and Singularity Methods for Linearized Viscous Flow (C. Pozrikidis, book)
- Elementary Fluid Dynamics (D. J. Acheson, book)
- Low Reynolds Number Hydrodynamics (John Happel and Howard Brenner, book)
- Microhydrodynamics (Sangtae Kim and Seppo J. Karrila, book)
- Viscous Flow (H. Ockendon and J. R. Ockendon, book)
Assessment
The assessment for this course will be released on Monday 13th May 2024 at 00:00 and is due in before Friday 24th May 2024 at 11:00.
Assessment for all MAGIC courses is via take-home exam which will be made available at the release date (the start of the exam period).
You will need to upload a PDF file with your own attempted solutions by the due date (the end of the exam period).
If you have kept up-to-date with the course, the expectation is it should take at most 3 hours’ work to attain the pass mark, which is 50%.
Please note that you are not registered for assessment on this course.
Files
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Lectures
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